Phase transition for random walks on graphs with added weighted random matching

Abstract

For a finite graph G=(V,E) let G* be obtained by considering a random perfect matching of V and adding the corresponding edges to G with weight , while assigning weight 1 to the original edges of G. We consider whether for a sequence (Gn) of graphs with bounded degrees and corresponding weights (n), the (weighted) random walk on (Gn*) has cutoff. For graphs with polynomial growth we show that (1n)|Vn| is a sufficient condition for cutoff. Under the additional assumption of vertex-transitivity we establish that this condition is also necessary. For graphs where the entropy of the simple random walk grows linearly up to some time of order |Vn| we show that 1n|Vn| is sufficient for cutoff. In case of expander graphs we also provide a complete picture for the complementary regime 1n|Vn|.